How can I prove that the language `L={w|#a(w)=#b(w)=#c(w)}`

is not context free using closure ?

Thanks

**EDIT :**

I know that the language `L1 = {a^i b^i c^i | i>=0}`

is not a context free language .
Now I'm trying to find another language `L2`

, where `L2`

would be a regular language , in order to make a contradiction , since if `L1`

is context free and `L2`

is a regular language , then `L1∩L2`

is also context free .